Conformal invariants of isometric embeddings of the smooth metrics on a surface

Abstract

We view all smooth metrics g on a closed surface through their Nash isometric embeddings fg: (,g) → (Sn, g) into a standard sphere of large, but fixed, dimension n. We define the Willmore functional Wfg over this space of metrics on in terms of the extrinsic quantities of fg. Its infimum over metrics in a conformal class is an invariant of the class varying differentiably with it. If is oriented of genus k, when k=0, we use the gap theorem of Simons to show that there is a unique conformal class of metrics on , whose invariant 16π is the value for the standard totally geodesic embedding of S2 Sn, and we have that Wfg() ≥ 16π, with the lower bound achieved if, and only if, fg is conformally equivalent to this standard geodesic embedding of S2, and areag() ≤ 4π, while when k≥ 1, the Lawson minimal surface (k,1,g_k,1) fixes the scale, and we show that Wfg() ≥ 4\, areag_k,1 (k,1), with the lower bound achieved by fg if, and only if, fg is conformally equivalent to fg_k,1 : (k,1, g_k,1) → (S3,g) (Sn,g), and areag()≤ areag_k,1 (k,1). For a nonoriented , we prove a likewise estimate from below for Wfg(), and characterize conformally the surface that realizes the optimal lower bound.